Mapping properties of the Hilbert and Fubini--Study maps in K\"ahler geometry
Abstract
Suppose that we have a compact K\"ahler manifold X with a very ample line bundle L. We prove that any positive definite hermitian form on the space H0 (X,L) of holomorphic sections can be written as an L2-inner product with respect to an appropriate hermitian metric on L. We apply this result to show that the Fubini--Study map, which associates a hermitian metric on L to a hermitian form on H0 (X,L), is injective.
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